Landau–Ramanujan constant

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In mathematics, the Landau–Ramanujan constant occurs in a number theory result stating that the number of positive integers less than x that are the sum of two square numbers, for large x, varies as

x/{\sqrt{\ln(x)}}.

The constant of proportionality is the Landau–Ramanujan constant, which was discovered independently by Edmund Landau and Srinivasa Ramanujan.

More formally, if N(x) is the number of positive integers less than x that are the sum of two squares, then

\lim_{x\rightarrow\infty} \frac{N(x)\sqrt{\ln(x)}}{x}\approx 0.764223653589220662990698731250092328116790541.

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